Một trường tiểu học có 600 học sinh trong đó số học sinh nam hơn số học sinh nữ là 108 học sinh. a) Số học sinh nam chiếm bao nhiêu phần trăm học sinh toàn trường ? b) Cuối năm trường đó có 15% số học sinh được xếp loại học lực khá. Hỏi trường đó có bao nhiêu học sinh xếp loại học lực loại khá ?
Hãy nhập câu hỏi của bạn vào đây, nếu là tài khoản VIP, bạn sẽ được ưu tiên trả lời.
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
Số học sinh nam là :
( 600 + 108 ) : 2 = 354 ( học sinh nam )
a ) Số phần trăm học sinh nam chiếm số học sinh toàn trường là :
354 x 100 : 600 = 59 %
b ) Số học sinh xếp loại học lực khá là :
600 x 15 phần 100 = 90 ( học sinh khá )
Đáp số : a ) 59 %
b ) 90 học sinh khá
![](https://rs.olm.vn/images/avt/0.png?1311)
Số học sinh nam của trường đó là:
\(\left(600+108\right)\div2=354\)(em)
Số học sinh nam chiếm số phần trăm số học sinh toàn trường là:
\(354\div600\times100\%=59\%\)
Số học sinh nữ của trường đó là:
\(600-354=246\)(em)
Trường đó có số học sinh nữ xếp loại học lực khá là:
\(246\times50\div100=123\)(em)
![](https://rs.olm.vn/images/avt/0.png?1311)
Số học sinh nam là
( 600 + 108 ) : 2 = 354 (hoc sinh )
Số học sinh nam chiếm số % số học sinh cả trường là
(354 x 100 ) : 600 = 59 %
Trường đó có số học sinh xếp lực khá là
600 : 100 x 15 = 910 (hoc sinh)
Mik nhanh nhất nha,k mik nha,chúc các bạn học tốt
![](https://rs.olm.vn/images/avt/0.png?1311)
Đáp án:55%
Giải thích các bước giải:
Số học sinh nam của trường đó là:
(500+50):2=275(học sinh)
Số học sinh nam chiếm số phần trăm số học sinh toàn trường là:
275 : 500x 100=55%
Đáp số:55%
Cách giải:
Cách giải:
Cách 1: - Số lớn = (tổng + hiệu): 2
- Số bé = số lớn – hiệu (hoặc tổng - số lớn)
Cách 2: - Số bé = (tổng – hiệu) : 2
- Số lớn = số bé + hiệu (hoặc tổng – số bé)
số học sinh nam là :
(500-50):2=225(học sinh)
học sinh nam chiếm :
225:500=45%
ĐS:...
![](https://rs.olm.vn/images/avt/0.png?1311)
Số học sinh nam của trường đó là:
(500+50):2=275(học sinh)
Số học sinh nam chiếm số phần trăm số học sinh toàn trường là:
275 : 500x 100=55%
Đáp số:55%
![](https://rs.olm.vn/images/avt/0.png?1311)
a) Số học sinh nam chiếm số phần trăm số học sinh của trường đó là:
\(582\times100:1000=58,2\)\(\%\)
b) Số học sinh nữ chiếm số phần trăm số học sinh của trường đó là:
\(100\%-58,2\%=41,8\%\)
Đ/số:....
a) Số học sinh nam chiếm số phần trăm tổng số học sinh trường đó là: \(582\div1000=0,582\times100=58,2\%\)
b) Số học sinh nữ của trường đó là: \(1000-582=418\)\(\left(hs\right)\)
Số học sinh nữ chiếm số phần trăm tổng số học sinh trường đó là: \(418\div1000=0,418\times100=41,8\%\)
Đ/số:....
![](https://rs.olm.vn/images/avt/0.png?1311)
Số hs nam là: \(418+164=582hs\)
a.Số hs nam chiếm số % hs nữ là: \(582:418=1,3923=129,23\%\)
b.Số hs nam chiếm số % hs của trường là: \(582:\left(582+418\right)=0,582=58,2\%\)
số học sinh nam là
(418+164):2= 291 hs
số học sinh nữ là
291-164= 127 hs
a) hs Nam so với nữ
291:127x100= 230%
b) hs nam so vơi tổng hs
291:418x100=70%
p/s số lẻ đc làm tròn
![](https://rs.olm.vn/images/avt/0.png?1311)
BÀI LÀM
a) Tỉ số học sinh nữ so với học sinh toàn trường là:
850:1800=47,2%
b) Học sinh nam có là :
1800-850=950(học sinh)
Tỉ số học sinh nam so với học sinh toàn trường là:
950:1800=52,7%
c)Tỉ số phần trăm số học sinh nam và số học sinh nam là:
950:850=111,7647059%
Đáp số :a) 47,2% b) 52,7% c) 111,7647059%
Giải hộ mik nhé các bạn
Tham khảo:
![](data:image/png;base64,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)